On the scaling property in fluctuation theory for stable L\'evy processes

Abstract

We find an expression for the joint Laplace transform of the law of (T[x,+∞[,XT[x,+∞[) for a L\'evy process X, where T[x,+∞[ is the first hitting time of [x,+∞[ by X. When X is an α-stable L\'evy process, with 1<α<2, we show how to recover from this formula the law of XT[x,+∞[; this result was already obtained by D. Ray, in the symmetric case and by N. Bingham, in the case when X is non spectrally negative. Then, we study the behaviour of the time of first passage T[x,+∞[, conditioned to \XT[x,+∞[ -x ≤ h\ when h tends to 0. This study brings forward an asymptotic variable Tx0, which seems to be related to the absolute continuity of the law of the supremum of X.